Let up to terms and . If , then is equal to:
JEE Mathematics 2024 Question with Solution
Answer
Correct answer:353
Step-by-step solution
Standard Method
Given: up to terms and .
Find: from .
Identify the sequence inside : . Its first differences are , so the general term is quadratic. Let
Using
we get
Solving,
Hence
So
Therefore,
From the extracted working,
Thus
Now use
Therefore, the value of is .
Term-by-term Evaluation
Given: the terms inside are .
Find: evaluate and then solve for .
Using the pattern of successive increments, the next terms are
So the first terms contribute
Also,
Then
Now solve
Therefore, the value of is .
Common mistakes
A common mistake is to treat as an arithmetic progression. That is wrong because the first differences are not constant. Instead, notice that the differences increase by , so the underlying term formula is quadratic.
Another mistake is to interpret as the sum of the unsquared terms. The question defines , so each listed term must be squared before summation.
Students often compute instead of . This changes the entire value of the expression. Always check the exponent carefully before substituting a summation formula or expanding terms.
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